Structural stress analysis

ABSTRACT

This need is met by the present invention wherein structural stress in a fatigue-prone region of a structure is determined by using the nodal forces and displacement values in the fatigue-prone region, or equilibrium-equivalent simple stress states consistent with elementary structural mechanics in the fatigue-prone region. The determination is substantially independent of mesh size and is particularly well-suited for applications where S-N curves are used in weld fatigue design and evaluation, where S represents nominal stress or stress range and N represents the number of cycles to failure. The present invention is directed to structural stress analysis through various combinations of modeling, calculation, and direct measurement schemes.

CROSS-REFERENCE TO RELATED APPLICATIONS

This application is a division of U.S. patent application Ser. No. 09/992,552 (Attorney Docket No. BAT 0031 PA) for STRUCTURAL STRESS ANALYSIS, filed Nov. 16, 2001 which claims the benefit of U.S. Provisional Application Ser. No. 60/249,800 (Attorney Docket No. BAT 0031 MA) for STRUCTURAL STRESS CALCULATION SCHEME, filed Nov. 17, 2000.

BACKGROUND OF THE INVENTION

The present invention relates to structural stress analysis and, more particularly to stress calculations and a scheme for calculating structural stress where the structure contains geometric discontinuities, e.g., welded joints, notches, ridges, bends, sharp corners, etc.

Stress analysis is used primarily in the design of solid structures such as ships, automobiles, aircraft, buildings, bridges, and dams for determining structural behavior and for ascertaining structural viability and integrity under anticipated or foreseeable loads. The analysis may involve the use of an abstract or mathematical model for the representation of the structural system and loads. According to classical analytical idealization, partial differential equations are used. For example, stress in a dam under a hydrostatic load can be described by an elliptic partial differential equation in two spatial dimensions.

As boundary geometry of structural systems is usually complicated, the partial differential equations of structural mechanics typically cannot be solved in the closed analytical exact form. Numerical approximations are sought instead. In one approach, derivatives are replaced with finite differences. Other methods are based on finding an approximation as a linear combination of preassigned functions such as polynomials or trigonometric functions. Also, after a domain or a boundary of interest has been discretized in the form of a large number of small elements, a piece-wise approximation can be sought according to the finite element method.

Current methods of stress analysis based upon numeric approximations and extrapolation are often subject to substantial uncertainties in regions of close proximity to welds, joints, sudden changes of geometry, or other structural or geometric discontinuities and are highly dependent on element size and are typically mesh dependent, particularly if drastically different loading modes are considered. Accordingly, there is a need for an improved structural stress analysis scheme for fatigue prediction that effectively eliminates or minimizes mesh dependency.

BRIEF SUMMARY OF THE INVENTION

This need is met by the present invention wherein structural stress in a fatigue-prone region of a structure is determined and analyzed by using:

-   -   i) the nodal forces and displacement values in the fatigue-prone         region, or     -   ii) equilibrium equivalent simple stress states consistent with         elementary structural mechanics in the fatigue-prone region.         Of course, it is contemplated that combinations, equivalents, or         variations of the recited bases may alternatively be employed.         The determination is substantially independent of mesh size and         is particularly well-suited for applications where S-N curves         are used in weld fatigue design and evaluation, where S         represents nominal stress or stress range and N represents the         number of cycles to failure.

Throughout the present specification and claims certain quantities, functions, parameters, and values are described or identified as being determined, calculated, or measured. For the purposes of defining and describing the present invention, it is noted that the use of one of these terms herein is not intended to exclude steps that incorporate or may be defined with reference to another of the terms. For example, a “determination” may incorporate aspects that are measured or calculated, a “calculation” may depend upon a specific measurement or determination, and a measurement may be based upon a calculation or determination. The term “analysis” is utilized herein to refer to an identification, review, or examination of the results of a determination, calculation, measurement, or combination thereof.

For the purposes of defining and describing the present invention, it is noted that reference to a “mesh” or “grid” herein relates to the use of any defined reference framework for identifying, quantifying, or otherwise defining individual portions of an object or an actual or virtual model of an object. Typically, a single quantitative value is associated with individual points along the reference framework or with individual portions defined by the reference framework. A calculation that is mesh insensitive is substantially unaffected by the inherent precision, frequency, or definition of the reference framework. In stress/strain evaluation, it is common to utilize a finite element mesh derived by dividing a physical domain into smaller sub-domains or elements in order to facilitate a numerical solution of a partial differential equation. Surface domains may be subdivided into triangle or quadrilateral shapes, while volumes may be subdivided primarily into tetrahedral or hexahedral shapes. The size, shape and distribution of the elements is ideally defined by automatic meshing algorithms.

The present invention is directed to a structural stress calculation scheme that generates stress determinations that are substantially independent of the size, shape and distribution of the mesh elements. Validations of the stress analysis scheme of the present invention reveal that structural stress determined according to the present invention proved to be substantially independent of mesh size over at least the following mesh size ranges: (i) from about 0.16t and 0.1t, along respective x and y axes, to about 2t and t along respective x and y axes; (ii) from about 0.5t and t, along respective x and y axes, to about 2t and t along respective x and y axes; and (iii) from about 0.008t and 0.02t, along respective x and y axes, to about 0.4t and 0.5t along respective x and y axes, where t represents the thickness of the structure. For the purposes of defining the present invention, it is noted that claims reciting a mesh are intended to cover any reference framework, like a mesh, grid, or other framework, where a domain is divided into sub-domains or elements.

The present invention has application to stress evaluation of a variety of welded and non-welded joints, notches, ridges, bends, sharp corners, and other discontinuities or sudden changes in geometry in metallic, plastic and ceramic structures. Relevant structures include aircraft and aerospace equipment (aircraft, helicopters, rockets, gantries); agricultural equipment (aerators, balers, baggers, choppers, combines, cultivators, elevators, feeders, grain hoppers, bins and sorters, harrows, harvesters, mowers, mulchers, planters, plows, scrapers, seeders, shredders, sprayers, spreaders, tillers, threshers, tractors); agricultural structures (silos, barns, brooders, incubators); automobiles and trucks (automobiles, trucks, trailers, wagons, axles, hitches); construction and lifting equipment (bulldozers, cranes, hoists, winches, jacks, chains, spreaders, hi-los, backhoes, forklifts, loaders, haulers, scrapers, excavators, graders, trenchers, borers, directional drillers, pulverizers, saws); forestry equipment (skidders, feller bunchers, log loaders, log splitters); mining equipment; rail car frames; ships; submarines and submersibles; ports and port equipment (docks, piers, cranes, lighthouses); bridges (bridges, bridge expansion joints); channels or canals; tunnels; building components (doors, door frames, windows, sashes, shutters, soffits, fascia, skylights, scaffolding, cabinetry, chimneys and flues, elevators); building materials (framing channels and struts, joists, trusses and truss plates, wire reinforced concrete); appliances, home and industrial (sinks, stoves, ovens, refrigerators, baths); buildings/skyscrapers (steel decks, mezzanines); housing, particularly manufactured or modular; heating and cooling systems (especially ducts); home improvement equipment (ladders, hand tools); fencing and gates; plumbing (pipes, fittings, pumps, sewage lines); irrigation and drainage equipment (pipes, irrigation sprinkler systems, drains and drainpipes); manufacturing equipment and machinery (conveyors, fasteners, riveters); diving equipment; nuclear containers and facilities; offshore oil rigs; diesel and gas turbines; pipelines; derricks and digger derricks; cooling towers; radio towers/transmitters; welded structures (welded wire reinforcements); tanks and cisterns (esp. for water storage); aircraft components; automotive parts; footwear; household components (sinks, showers, plumbing pipe, swimming pools); sporting goods; ceramics; concrete; porcelain enamel; sealants and sealed structures, adhesively bonded structures; etc.

The stress analysis scheme of the present invention may also be utilized to monitor stress, predict failure, schedule maintenance, determine fatigue, and analyze structures. The structural stress analysis scheme of the present invention is particularly significant in these contexts because a 10% variation in a stress value could translate into a life cycle that varies by as much as 100-200%. Further, the stress analysis scheme of the present invention may be utilized as a structural design tool directed at optimizing manufacturing costs or as a tool for monitoring, locally or remotely, structural stress in situ or during manufacture or assembly to guide manufacturing or assembly steps. Structures may be analyzed by imaging the structure, creating a model of the structure and applying the principles of the present invention to assess the stress in the structure. It is contemplated that the scheme of the present invention may be incorporated into an otherwise conventional, field-ready hand-held or desk top computer or programmable device.

BRIEF DESCRIPTION OF THE SEVERAL VIEWS OF THE DRAWINGS

The following detailed description of the preferred embodiments of the present invention can be best understood when read in conjunction with the following drawings, where like structure is indicated with like reference numerals and in which:

FIGS. 1A, 1B, 1C, and 1D illustrate typical welded joints and corresponding structural stress definitions and local stress distributions associated therewith;

FIGS. 2A and 2B illustrate structural stress definitions and local stress distributions associated with spot and laser lap joints;

FIG. 3 illustrates normal and shear stress distributions from a typical finite element model at a reference cross section of a structure for structural stress calculations;

FIG. 4 represents a structural stress definition, taken along section line A-A, corresponding to the normal and shear stress distributions of FIG. 3;

FIG. 5A illustrates local normal stress and shear stress distributions at a reference cross-section for a fatigue failure criterion corresponding to a structure including partial thickness fatigue crack;

FIG. 5B represents the structural stress definition relative to the overall thickness of the structure of FIG. 5A;

FIG. 5C represents the structural stress definition for the structure of FIG. 5A with a partial thickness fatigue crack failure;

FIG. 6A illustrates local normal and shear stress distributions of a structure defining a non-monotonic through thickness stress distribution at a weld toe of the structure;

FIG. 6B illustrates respective local normal and shear stress distributions at a reference section of the structure illustrated in FIG. 6A;

FIG. 6C illustrates structural stress components relative to both upper and lower portions of the structure illustrated in FIG. 6A;

FIG. 7 is a flow chart illustrating a method of calculating structural stress for general three dimensional structures according to the present invention;

FIG. 8 illustrates a shell model and corresponding elements for structural stress extraction according to one embodiment of the present invention;

FIG. 9 illustrates a solid model and corresponding elements for structural stress extraction according to one embodiment of the present invention;

FIG. 10 illustrates a scheme for analyzing structural stress by utilizing stress resultants directly available from finite element codes or another source of similar data; and

FIGS. 11 and 12 illustrate experimental techniques for measuring structural stress.

DETAILED DESCRIPTION

The following detailed description is presented according to the following subject matter outline, as delineated in the body of the description:

-   1. Structural Stress Analysis by Enforcing Equilibrium Conditions     and solving for σ_(B), and σ_(M). -   1.1. Stress Analysis by Using Stress Distributions or σ_(x)(y) and     τ_(xy)(y). -   1.2. Stress Analysis by Using Stress Resultants. -   1.3. Special Applications—Partial Thickness Fatigue Crack. -   1.4. Special Applications—Non-Monotonic Through-Thickness     Distributions. -   2.0. Calculation of Structural Stress by Conversion of Nodal Forces     and Moments. -   2.1. Conversion of Nodal Forces and Moments Retrieved Directly from     Shell Model. -   2.2. Conversion of Nodal Forces and Moments by Generating Stiffness     Matrices and Nodal Displacements from the Shell Model. -   2.3. Conversion of Nodal Forces and Moments from Three-Dimensional     Solid Model. -   3. Experimental Techniques for Measuring Structural Stress -   3.1. Monotonic Through-Thickness Distributions -   3.2. Non-monotonic Through-Thickness Stress Distributions

Referring initially to FIGS. 1A, 1B, 1C and 1D, it is noted that structures containing geometric discontinuities generally possess localized stress concentrations and corresponding through-thickness stress distributions. For example, the structure or plate 10 illustrated in FIG. 1A includes a fillet weld 12 and defines a particular through-thickness stress distribution σ_(x)(y). The stress distribution σ_(x)(y) is defined along a cross section of the structure 10 in a fatigue-prone region or weld toe 14 of the weld 12 and may be obtained, for example, from a finite element model of the structure 10. FIG. 1B illustrates the corresponding structural stress definition in terms of two components σ_(M), σ_(B) of the structural stress σ_(s) in the localized fatigue-prone region 14. The structural stress definition illustrated in FIG. 1B is effectively a simple structural stress distribution in the form of membrane and bending components σ_(M), σ_(B) that are equilibrium-equivalent to the local stress distributions in FIG. 1A.

Through-thickness stress distributions σ_(x)(y) with respect to potential failure planes for a structure 10′ including lap fillet joints 12′ are illustrated in FIG. 1C. In such joint types, depending on actual geometry and loading conditions, three possible fatigue-prone regions or failure planes exist: (1) weld root failure along the weld throat; (2) weld toe failure; and (3) weld root/toe failure. The through-thickness stress distributions σ_(x)(y) correspond to cross sections of the structure 10′ taken along the different fatigue-prone regions of the structure 10′. The corresponding equilibrium-equivalent simple structural stress definitions are illustrated in FIG. 1D in terms of the two components σ_(M), σ_(B) of the structural stress σ_(s) in the different fatigue-prone regions.

Referring now to FIGS. 2A and 2B, local normal stress distributions σ_(x)(y) along a typical failure plane are illustrated for structures 10″ including a spot weld 12″ (e.g., a resistance spot weld) or a laser lap weld 12″. Regardless of whether the structure 10″ includes a laser lap weld or resistance spot weld, the local normal stresses and structural stresses are essentially defined the same. Note that for resistance spot welds, see FIG. 2A, both the local stresses and the structural stresses are a function of circumferential angle. In the case of typical laser lap welds, see FIG. 2B. In the case of a laser lap weld, the weld area will occupy the entire cross-section without the half-width (w/2). If the stress quantities can be adequately defined in the x-y plane of FIG. 2B despite the fact that the long lap joint extends in a direction orthogonal to the x-y plane.

FIG. 3 illustrates in further detail the local normal stress distribution σ_(x)(y) and the shear stress distribution τ_(xy)(y) of a structure 20 or, more specifically, a structural member 20, in a fatigue-prone region 24 in the vicinity of a weld 22 of the structure 20. The values of σ_(x)(y) and τ_(xy)(y) are taken along line B-B of FIG. 3 for calculation purposes only. The value of t corresponds to the thickness of the structure 20 in the selected cross section. The structural mid-plane 26 is illustrated in FIGS. 3 and 4. FIG. 4 represents a structural stress definition corresponding to σ_(x)(y) and τ_(xy)(y) along section A-A of FIG. 3 and includes, more particularly, the two components σ_(M), σ_(B) of the structural stress σ_(s) in the localized fatigue-prone region 24. Also illustrated in FIGS. 3 and 4 is the variable δ which represents the finite element size of a finite element model utilized in calculating structural stress according to the present invention. Typically, a single element row corresponds to the distance between sections A-A and B-B. It is noted that σ_(B) assumes a value of zero at the structural mid-plane 26.

1. Structural Stress Analysis by Enforcing Equilibrium Conditions and solving for σ_(B), and σ_(M)

A finite element model of a structure can be used to retrieve either stress outputs or nodal forces and displacements of the structure. If nodal forces and displacements are retrieved from the model, they can be used to calculate structural stresses in an accurate manner. In using two and three-dimensional solid element models, it can be more convenient to retrieve stress outputs directly from the finite element model. Stress outputs retrieved in this manner must, however, be processed by enforcing equilibrium conditions at a reference location in the structure.

According to the methodology of one embodiment of the present invention, structural stress or in a localized fatigue-prone region of a structure (e.g., section A-A of FIGS. 3 and 4) is defined in terms of the bending and membrane components σ_(B), σ_(M) of the structural stress σ_(s) in the region. The structural stress is calculated by enforcing equilibrium conditions in the region and performing a selected integration utilizing stress distributions σ_(x)(y) and τ_(xy)(y) derived from an established source, such as a finite element model.

As will be appreciated by those practicing the present invention, finite element models of a variety of structures have been, and may be, generated through computer-aided engineering. These finite element models may be used to derive individual stresses or internal loads for an area of interest within the structure. Accordingly, the stress distributions σ_(x)(y) and τ_(xy)(y) are typically derived from a finite element model and are described herein in the context of finite element models. It is important to note, however, that the stress distributions may be derived or input from any of a variety of sources, either existing or yet to be developed. For example, a number of finite difference models and so-called meshless calculation systems are currently under development for structural stress modeling.

The structural stress distribution σ_(x)(y) must satisfy equilibrium conditions within the context of elementary structural mechanics theory at both the hypothetical crack plane (e.g., at weld toe 14 in FIG. 1A) and a nearby reference plane, on which local stress distributions are known a priori from typical finite element solutions. The uniqueness of such a structural stress solution can be argued by considering the fact that the compatibility conditions of the corresponding finite element solutions are maintained at this location in such a calculation.

It should be noted that in typical finite element based stress analysis, the stress values within some distance from the weld toe can change significantly as the finite element mesh design changes. This behavior is referred to herein as mesh-size sensitivity. While local stresses near a notch are mesh-size sensitive due to the asymptotic singularity behavior as a notch position is approached, the imposition of the equilibrium conditions in the context of elementary structural mechanics according to the present invention eliminates or minimizes the mesh-size sensitivity in structural stress calculations. This is due to the fact that the local stress concentration close to a notch is dominated by self-equilibrating stress distribution.

1.1. Stress Analysis by Using Stress Distributions σ_(x)(y) and τ_(xy)(y).

According to one method of the present invention, a cross section of interest (e.g., section B-B of FIGS. 3 and 4), the location of which is defined by a unit width, is selected such that the localized, fatigue-prone, region lies adjacent to the selected cross section. For the purposes of describing and defining the present invention, it is noted that elements that are separated by a single element distance from a selected cross section are said to lie adjacent to the cross section.

A first component σ_(M) of the structural stress σ_(s) in the localized region (e.g., section A-A of FIGS. 3 and 4) represents what may be referred to as a membrane component of the structural stress σ_(s). A second component σ_(B) of the structural stress σ_(s) in the localized region represents what may be referred to as a bending component of the structural stress σ_(s). The structural stress σ_(s) is calculated by combining the first component σ_(M) of the structural stress and the second component σ_(B) of the structural stress as follows: σ_(s)=σ_(M)+σ_(B)

By imposing equilibrium conditions between Sections A-A and B-B, the structural stress components σ_(m) and σ_(b) may be determined according to the following equations. Specifically, the first component σ_(M) of the structural stress σ_(s) in the localized region is determined according to the following equation: $\sigma_{M} = {\frac{1}{t}{\int_{0}^{t}{{\sigma_{x}(y)}{\mathbb{d}y}}}}$

The stress distribution σ_(x)(y) along the selected cross section represents the local structural through-thickness stress distribution and is determined from the finite element model of the structure. The second component σ_(B) of the structural stress σ_(s) in the localized region is determined by solving the following equation for σ_(B): ${{\left( \frac{t^{2}}{2} \right)\sigma_{M}} + {\left( \frac{t^{2}}{6} \right)\sigma_{B}}} = {{\int_{0}^{t}{{\sigma_{x}(y)}y{\mathbb{d}y}}} + {\delta{\int_{0}^{t}{{\tau_{xy}(y)}{\mathbb{d}y}}}}}$

The term y corresponds to a distance along the y-axis from y=0 to a material point of interest in the selected cross section. The term t corresponds to the thickness of the structure in the selected cross section and δ represents the element size of the finite element model. The function τ_(xy)(y) represents the shear stress distribution and is determined from the finite element model of the structure. It is contemplated that, in practice, a row of elements may be used between the localized fatigue-prone region of a structure (e.g., section A-A of FIGS. 3 and 4) and the selected cross section (e.g., section B-B of FIGS. 3 and 4).

The equation for the first component σ_(M) of the structural stress σ_(s) represents the force balances in the x direction, evaluated along B-B. The equation for the second component σ_(B) of the structural stress σ_(s) represents the moment balances with respect to Section A-A at y=0. The integral term on the right hand side of the equation for the second component σ_(B) represents the transverse shear force as a component of the structural stress definition. Accordingly, it is noted that, under certain conditions, such as if the transverse shear effects are not significant or if the finite element formulation provides adequate consideration of shear locking effects (particularly when using relatively large size elements), the structural stresses can be calculated directly from section A-A as follows: $\sigma_{M} = {{{\frac{1}{t}{\int_{0}^{t}{{\sigma_{x}(y)}{\mathbb{d}{y\left( \frac{t^{2}}{2} \right)}}\sigma_{M}}}} + {\left( \frac{t^{2}}{6} \right)\sigma_{B}}} = {\int_{0}^{t}{{\sigma_{x}(y)}y{\mathbb{d}y}}}}$ 1.2. Stress Analysis by Using Stress Resultants.

Referring briefly to FIG. 10, stresses and nodal quantities from shell or plate finite element models are often defined in a global coordinate system (x, y, z), depending on the finite element codes used. Given the definition of the structural stress components in Eq. 1, it is the local coordinate system (x′,y′,z′) that is convenient for calculating the structural stresses with respect to a weld, with local x′ and y′ being perpendicular and parallel to the weld direction, respectively. Consistent with the solid element model approach (e.g., see FIG. 3), three components of the stress resultants (sectional forces and moments), i.e., f_(x′), f_(z′), and m_(y′), at Section B-B in FIG. 10 can be used to calculate the structural stress components at Section A-A: it is noted that structural stress may also be analyzed by utilizing stress resultants directly available from finite element codes or another source of similar data. Specifically, three components of the stress resultants f_(x′), f_(z′), and m_(y′), in at Section B-B in FIG. 10 can be used to calculate the structural stress components at Section A-A according to the following equation: $\sigma_{s} = {{\sigma_{M} + \sigma_{B}} = {\frac{f_{x^{\prime}}}{t} + \frac{6\left( {m_{y^{\prime}} + {\delta\quad f_{z^{\prime}}}} \right)}{t^{2}}}}$ where δand t represent the dimensional values illustrated in FIG. 10 and f_(x′), f_(z′), and m_(y′), represent the stress resultants illustrated in FIG. 10.

According to this aspect of the present invention, a finite element formulation with six degrees of freedom at each node is assumed, i.e., six components of generalized forces at each node (three translational and three rotational). If stresses in the global coordinate system are used, they must be transformed to the local coordinate system before structural stress is calculated in the manner described above.

1.3. Special Applications—Partial Thickness Fatigue Crack.

Referring to FIGS. 5A, 5B, and 5C, an alternative scheme is described herein for calculating structural stress σ_(s) where the selected cross section of the structure at issue includes a partial thickness fatigue crack extending a distance t₁ below a surface of the structure. According to this alternative scheme, the stress calculation scheme discussed above with respect to FIGS. 3 and 4, is altered by introducing two additional structural stress parameters σ_(m)′ and σ_(b)′ to enable the calculation of structural stress σ_(s) where the selected cross section of the structure at issue includes the partial thickness fatigue crack extending a distance t₁ below a surface of the structure 20. The parameters σ_(m)′ and σ_(b)′ are illustrated in FIG. 5C. The overall through-thickness structural stress components σ_(m) and σ_(b), illustrated in FIG. 5B, are calculated as discussed above with respect to the components σ_(M) and σ_(B) of FIGS. 3 and 4. For the scheme of FIGS. 5A, 5B, and 5C, the structural stress σ_(s) is calculated by combining a redefined first component σ_(M) of the structural stress and a redefined second component σ_(B) of the structural stress as follows: σ_(s)=σ_(M)+σ_(B) According to this alternative scheme, the first and second components σ_(M), σ_(B) of the structural stress σ_(s) in the localized region, with respect to t₁ are determined by solving a first equation through direct integration and by solving simultaneously three equations with three unknowns.

A first equation of the four equations defines the sub-component σ_(m)′ of the structural stress σ_(s). A second equation of the four equations defines a force equilibrium condition. A third equation of the four equations defines a moment equilibrium condition. A fourth equation of the four equations defines a stress continuity condition.

Regarding the first equation, since σ_(m)′ is not mesh-size sensitive, it can be calculated by direct integration along B-B within the length of t−t₁ as follows: $\sigma_{M}^{\prime} = {{\frac{1}{t - t_{1}}{\int_{0}^{t - t_{1}}{{\sigma_{x}(y)}{\mathbb{d}y}}}} - {\frac{1}{t - t_{1}}{\int_{0}^{\delta}{{\tau_{yx}(x)}{\mathbb{d}x}}}}}$ where σ_(m)′ and σ_(b)′ comprise respective sub-components of the structural stress as and are taken relative to a reference line 26′ of the structure 20. The position of the reference line 26′ corresponds to the centroid or neutral axis of the region defined between t=0 and t=t−t₁. The structural mid-plane 26 is also illustrated.

By enforcing force balances along x and y, and moment balance at y=0 at Section A-A, the second, third, and fourth equations are available. The second equation, defining the force equilibrium condition along the x-axis, is as follows: σ_(M) t ₁+σ_(m)′(t−t ₁)=σ_(m) t where $\sigma_{m} = {{\frac{1}{t_{1}}{\int_{0}^{t_{1}}{{\sigma_{x}(y)}{\mathbb{d}y}}}} + {\frac{1}{t_{1}}{\int_{0}^{\delta}{{\tau_{yx}(x)}{\mathbb{d}x}}}}}$

The third equation, defining the moment equilibrium condition is as follows: ${{\left( {\sigma_{M} - \sigma_{B}} \right){t_{1}\left( {t - \frac{t_{1}}{2}} \right)}} + {\sigma_{B}{t_{1}\left( {t - \frac{t_{1}}{3}} \right)}} + {\sigma_{m}^{\prime}\frac{\left( {t - t_{1}} \right)^{2}}{2}} + {\sigma_{b}^{\prime}\frac{\left( {t - t_{1}} \right)^{2}}{6}}} = {{\sigma_{m}\left( \frac{t_{1}^{2}}{2} \right)} + {\sigma_{b}\left( \frac{t_{1}^{2}}{6} \right)}}$ where σ_(b) is determined by solving the following equation for σ_(b): ${{\left( \frac{t_{1}^{2}}{2} \right)\sigma_{m}} + {\left( \frac{t_{1}^{2}}{6} \right)\sigma_{b}}} = {{\int_{0}^{t_{1}}{{\sigma_{x}(y)}y{\mathbb{d}y}}} + {\delta{\int_{0}^{t_{1}}{{\tau_{xy}(y)}{\mathbb{d}y}}}} + {\int_{0}^{\delta}{{\sigma_{y}(x)}x{\mathbb{d}x}}}}$ where the term t corresponds to the thickness of the structure in the selected cross section and δ represents the element size of the finite element model. The function τ_(xy)(y) represents the shear stress distribution and is determined from the finite element model of the structure.

The fourth equation, defining the stress continuity condition at y=t−t₁ is as follows: σ_(M)−σ_(B)=σ_(m)′+σ_(b)′

These three additional equations, defining three unknowns (σ_(M), σ_(B), σ_(b)′), may be solved simultaneously, according to conventional methods, to determine the values of the first and second components σ_(M), σ_(B) of the structural stress σ_(s) in the localized region.

1.4. Special Applications—Non-Monotonic Through-Thickness Distributions.

Referring now to FIGS. 6A, 6B, and 6C, a process for calculating structural stress in a localized fatigue-prone region of a structure 30 defining a non-monotonic through thickness stress distribution is illustrated. The structure 30 includes a pair of welds 32 defining weld toes 34 and is merely illustrated partially and schematically in FIGS. 6A, 6B, and 6C. FIG. 6A illustrates local normal and shear stress distributions of the structure 30 at the weld toe 34 of the structure 30. FIG. 6B illustrates respective local normal σ_(x)(y) and shear τ_(xy)(y) stress distributions at a reference section of the structure 30. FIG. 6C illustrates structural stress components relative to both upper and lower portions of the structure 30.

The stress distribution σ_(x)(y) of FIGS. 6A and 6B defines a minimum axial stress along a secondary axis 36′ of the structure 30 where the transverse shear stress distribution τ_(xy)(y) changes signs. The secondary axis 36′ of the structure lies a distance t₂ below a surface of the structure 30. The structural mid-plane 36 is also illustrated in FIGS. 6A, 6B, and 6C. The cross-section references A-A and B-B are similar to those described above with reference to FIGS. 3 and 4. The parameter t₂ can be determined based on the position at which the transverse shear stress changes direction, if there is no specified crack depth as a failure criterion.

Two additional structural stress parameters σ_(m)′ and σ_(b)′ are illustrated in FIG. 6C. FIG. 6C illustrates these further sub-components σ_(m)′ and σ_(b)′ of structural stress σ_(s) taken relative to the secondary axis 36′ of the structure 30. FIG. 6C also illustrates the two primary components σ_(M) and σ_(B) of the structural stress σ_(s) where σ_(S)=σ_(M)+σ_(B) and where the stress continuity condition at y=t−t₂ is as follows: σ_(M)−σ_(B)=σ_(m)′+σ_(b)′

FIG. 6C also illustrates the structural stress definitions corresponding to the non-monotonic through-thickness stress distribution illustrated in FIG. 6A. If the stress distribution σ_(x)(y) is symmetric with respect to the mid-plane 36 of the structural member 30, then t₂=t/2 and the reference plane 36′ coincides with the mid-plane 36. Generally, σ_(M), σ_(B), σ_(b)′, and σ_(m)′ can be solved in a manner similar to the scheme illustrated above with respect to the embodiment of FIGS. 5A, 5B, and 5C, provided t₂ has been determined. The parameter t₂ can be determined either by considering equilibrium conditions with respect to the entire through-thickness section (t) or, more conveniently, by identifying the point at which the transverse shear stress distribution τ_(xy)(y) changes signs, as is also discussed above with reference to the location of the structural mid-plane 26 of FIG. 5B.

Where the top surface of the structure 30 corresponds to the location of the maximum structural stress, the structural stress σ_(s) in the localized region may be calculated by solving simultaneously the following equations for the two unknowns, σ_(M), σ_(B): $\sigma_{M} = {{{\frac{1}{t_{2}}{\int_{t - t_{2}}^{t}{{\sigma_{x}(y)}{\mathbb{d}{y\left( \frac{t_{2}^{2}}{2} \right)}}\sigma_{M}}}} + {\left( \frac{t_{2}^{2}}{6} \right)\sigma_{B}}} = {{\int_{t - t_{2}}^{t}{{\sigma_{x}(y)}y{\mathbb{d}y}}} + {\delta{\int_{t - t_{2}}^{t}{{\tau_{xy}(y)}{\mathbb{d}y}}}}}}$

The two additional structural stress parameters σ_(m)′ and σ_(b)′ can be calculated according to the following equations: $\sigma_{m}^{\prime} = {\frac{1}{t - t_{2}}{\int_{0}^{t - t_{2}}{{\sigma_{x}(y)}{\mathbb{d}y}}}}$ ${{\sigma_{m}^{\prime}\frac{\left( {t - t_{2}} \right)^{2}}{2}} + {\sigma_{b}^{\prime}\frac{\left( {t - t_{2}} \right)^{2}}{6}}} = {{\int_{0}^{t - t_{2}}{{\sigma_{x}(y)}y{\mathbb{d}y}}} + {\delta{\int_{0}^{t - t_{2}}{{\tau_{xy}(y)}{\mathbb{d}y}}}}}$

For the calculation of structural stress for resistance spot and laser lap welds (see FIGS. 2A and 2B), if two or three-dimensional solid element models are used, the calculation procedures are similar to the procedures described above with reference to FIG. 4. The fatigue crack typically initiates at the weld edge at the interface between the two sheets, where structural stress peak is located. A special case arises where the joint configuration and loading are symmetric with respect the neutral axis. In this case, the shear stress on the cross section along the symmetry line is zero and structural stress components may be calculated by substituting t₂=t/2 and τ_(yx)=0.

2.0. Calculation of Structural Stress by Conversion of Nodal Forces and Moments.

According to another embodiment of the present invention, structural stress σ_(s) in a localized fatigue-prone region of a structure is also calculated. This embodiment of the present invention involves conversion of relevant nodal forces and moments, or internal force and moments at the nodes of a group of elements aligned with a weld toe line, to sectional forces and moments and may or may not involve a direct integration step similar to that described herein with reference to FIGS. 3-6.

As will be appreciated by those practicing the present invention, finite element models of a variety of structures have been, and may be, generated through computer-aided engineering. These finite element models may be used to derive individual stresses for an area of interest within the structure. Accordingly, the nodal forces and moments are typically derived from a finite element model and are described herein in the context of finite element models. It is important to note, however, that the nodal forces and moments may be derived or input from any of a variety of sources, either existing or yet to be developed. For example, a number of finite difference models and so-called meshless calculation systems are currently under development for structural modeling.

2.1. Conversion of Nodal Forces and Moments Retrieved Directly from Shell Model.

Specifically, referring to FIGS. 7 and 8, according to one aspect of the present invention, structural stress σ_(s) in a localized fatigue-prone region of a structure is calculated from a finite element shell model of the structure. Typically, as is illustrated in FIG. 8, the structure and the welds are modeled with four-node (quadrilateral) shell or plate elements 42. Initially, a shell element model 40, see FIG. 8, of the structure at issue is generated utilizing a conventional computer aided engineering application (see step 100). Finite element analysis is performed on the shell element model (see step 102) and a determination is made as to whether nodal forces and moments for local elements of interest 42 can be directly retrieved from the output of the finite element analysis (see step 104). As is illustrated in FIG. 8, the elements 42 are positioned adjacent to a localized fatigue-prone region of a weld 44 and, as such, are identified for structural stress extraction. If the nodal force and moment vectors for the local elements 42 may be retrieved directly from the finite element shell model 40 then selected ones of the nodal force and moment vectors are converted to sectional force vectors n and moment vectors m with an appropriate mapping function that provides the consistent nodal loads, or work equivalent (see step 112). The conversion is performed in a work equivalent manner with respect to said nodal displacements determined for said nodal force and moment vectors (see step 113). Specifically, the conversion is performed such that a quantity of work corresponding to said nodal displacements and nodal force and moment vectors is equivalent to a quantity of work for said nodal displacements and said sectional force and moment vectors n and m.

The mapping function ideally should be the same as that used in the finite element program used in performing the structural analysis. The mapping function provides sectional forces (force per unit length) and moments (moment per unit length) corresponding to the nodal forces and moments. If high stress gradients exist, after mapping, the sectional forces and moments for a group of elements along the weld may not be continuous from one element to another. However, the total nodal forces and moments (as well as displacements) shared by neighboring elements at a nodal point or a grid point are correct from typical finite element solutions. The continuity in sectional forces and moments must be enforced by considering the neighboring elements and solving a system of linear equations formulated by using an appropriate mapping function for each element. The unknowns in the system of linear equations are sectional forces and moments at the nodes adjoining neighboring elements. The system of linear equations are formulated using nodal forces and moments (outputs from a finite element shell or plate models) and element geometric information. After solving the system of linear equations, the sectional forces and moments in the direction of interest can be used to calculate the structural stresses to be described below. If stress gradients along weld lines are not high and element shapes are not distorted, the structural stresses can be directly calculated on an element-by-element basis without resort to solving a system of linear equations, as discussed below with reference to the equation for structural stress σ_(s).

Structural stress σ_(s) in a localized fatigue-prone region of the structure may then be calculated according to the equation σ_(s)=σ_(B)+σ_(M) where σ_(B) is proportional to the sectional moment vector m and σ_(m) is proportional to the sectional force vector n. More specifically, the structural stress σ_(s) may be calculated utilizing the following equation: $\sigma_{s} = {{\sigma_{B} + \sigma_{M}} = {\frac{12\quad{mz}}{t^{3}} + \frac{n}{t}}}$ where t corresponds to the thickness of the structure in the fatigue-prone region and z ranges from +t/2 at the top surface of the structure to −t/2 at the bottom surface of the structure. 2.2. Conversion of Nodal Forces and Moments Using Stiffness Matrices and Nodal Displacements from the Shell Model.

In some applications, the reference section B-B in FIG. 10 may not be easily defined. This situation arises if welds are rather close to each other or load transfer at a weld of interest is very localized. If the element sectional forces and moments (with respect to the reference element in FIG. 10) at Section A-A are available from a finite element solution, the equilibrium requirements are automatically satisfied within the accuracy of the finite element solutions. In this context, if the nodal force and moment vectors can not be retrieved directly from the finite element model of the structure (see step 104) then the nodal force and moment vectors are computed by generating stiffness matrices and nodal displacements for the local elements in the fatigue-prone region from the finite element model (see step 106). The nodal force and moment vectors for elements of interest may then be computed by multiplying the stiffness matrices and nodal displacements to obtain global nodal force and moment vectors at nodal points of said local elements and transforming the resulting global force and moment vectors from the global coordinate system to the local coordinate system of an element of interest (see step 108). As is noted above, the transformation is performed in a work equivalent manner with respect to said nodal displacements (see step 109).

More specifically, the global stiffness matrix and nodal displacements may be used to determine local nodal force and moment vectors of an element of interest because the global element stiffness matrices and nodal displacements of the structure at issue are known (see step 110). The structural stress is calculated as follows: $\sigma_{s} = {{\sigma_{M} + \sigma_{B}} = {\frac{f_{x^{\prime}}}{t} + \frac{6\left( m_{y^{\prime}} \right)}{t^{2}}}}$ where t represents the dimensional value illustrated in FIG. 10 and f_(x′) and m_(y′) represent the stress resultants illustrated in FIG. 10.

It should be noted that, according to this aspect of the present invention, the finite element software used must allow for generation of the stiffness matrices and the nodal displacements for the elements of interest. It should also be noted that, since the element nodal forces and moments are based on finite element solutions, the transverse shear effects considered earlier in the context of two-dimensional solid models are already taken into account in the shell element approach.

2.3. Conversion of Nodal Forces and Moments from Three-Dimensional Solid Model.

As is illustrated in FIG. 9, structural stress σ_(s) in a localized fatigue-prone region of a structure may also be calculated from a finite element solid model of the structure by using nodal forces in a manner similar to that described above in the context of the shell/plate element models (see FIGS. 7 and 8). A general three dimensional finite element solid model 40′ including local elements 42′ and a weld 44 is illustrated in FIG. 9. A fatigue-prone plane of interest is illustrated along section A-B-C. Nodal forces on element faces can be either determined directly or through the local element stiffness matrix in a manner similar to that described in the context of FIG. 7. Once the nodal forces at the nodal positions are obtained, equivalent sectional forces and moments along Section A-B-C can then be obtained using consistent mapping or shape functions. The structural stress can then calculated with the equivalent sectional forces and moments in the manner described with reference to FIGS. 7 and 8. In addition, equivalent transverse shear effects need to be considered as discussed earlier with respect to the two-dimensional solid models.

It is contemplated that the various calculation schemes of the present invention are best performed with the aid of a computer programmed to execute the variety of calculation steps described herein or a computer arranged to read a suitable program stored on an appropriate recording medium.

3. Experimental Techniques for Measuring Structural Stress

Referring now to FIGS. 11 and 12, it is noted that the structural stress calculation schemes of the present invention may also be utilized in fashioning experimental techniques for measuring structural stress by enforcing equilibrium conditions within a strip element adjacent to the weld toe of interest.

3.1. Monotonic Through-Thickness Distributions

FIG. 11 illustrates the local normal stress distribution σ_(x)(y) of a structure 20 or, more specifically, a structural member 20, in a fatigue-prone region 24 in the vicinity of a weld 22 of the structure 20. The value of σ_(x)(y) is taken along line A-A. The value of t corresponds to the thickness of the structure 20 in the selected cross section. The structural mid-plane 26 is illustrated in FIG. 11. Strain gauges 60, or other displacement measuring devices, are arranged along cross-sectional lines B-B and C-C.

Where through-thickness normal stress distributions take the form as shown in FIG. 11, stresses at the strain gauges can be calculated using strain gauge readings from measured positions along sections B-B and C-C. If the through-thickness stress distributions at the measured positions are approximately linear then the stress measurements can be decomposed as follows: $\sigma_{b}^{B} = {\frac{1}{2}\left( {\sigma_{T}^{B} - \sigma_{B}^{B}} \right)}$ $\sigma_{b}^{C} = {\frac{1}{2}\left( {\sigma_{T}^{C} - \sigma_{B}^{C}} \right)}$ where the superscripts B and C indicate the sections at which the stresses are measured and subscripts T and B refer the values at the top and bottom surfaces, respectively. Linearity of the stress distributions at the measure positions can be readily confirmed by using one or more strain gauge readings, either at the top or bottom, to see if a linear distribution along the surface is developed.

The transverse shear resultant force effects at B-B, as described earlier in the context of finite element models, can be approximated by $F_{t} = {\frac{1}{l}\frac{I}{\left( {t/2} \right)}\left( {\sigma_{b}^{C} - \sigma_{b}^{B}} \right)}$ where I is the moment of inertia of the structural member 20. If the distance between sections A-A and C-C is small, the increase in the bending stress component at section A-A can be approximated as: $\sigma_{b} = {\sigma_{b}^{C} + {\frac{L}{l}\left( {\sigma_{b}^{C} - \sigma_{b}^{B}} \right)}}$ The structural stress, as defined previously in FIG. 4, can then be approximated based on the measurements at sections B-B and C-C as: $\sigma_{s} = {\sigma_{T}^{C} + {\frac{L}{l}\left( {\sigma_{b}^{C} - \sigma_{b}^{B}} \right)}}$ The distances among sections A-A, B-B, and C-C are typically measured in terms of fractions of thickness t. 3.2. Non-Monotonic Through-Thickness Stress Distributions

Referring now to FIG. 12, it is noted that non-monotonic stress distributions can be handled in a manner similar to that described above with reference to FIG. 11. FIG. 12 illustrates the local normal stress distribution σ_(x)(y) of a structure 30 or, more specifically, a structural member 30, in a fatigue-prone region 44 in the vicinity of a weld 32 of the structure 30. The value of σ_(x)(y) is taken along line A-A. The value of t corresponds to the thickness of the structure 30 in the selected cross section. The structural mid-plane 36 is illustrated in FIG. 11. Strain gauges 60 are arranged along cross-sectional lines B-B, C-C, and D-D.

Measurements at section D-D, where the stress distribution σ_(x)(y)′ becomes approximately linear, provide the through-thickness mean stress σ_(m) as follows: $\sigma_{m} = \frac{\left( {\sigma_{T}^{D} + \sigma_{B}^{D}} \right)}{2}$ Typically, σ_(m)=F/A (load F and cross-sectional area A are typically available). Accordingly, the structural stress component σ_(M), as defined in FIG. 6C, becomes σ_(M)=σ_(m) and σ_(b) ^(B)=σ_(T) ^(B)−σ_(m) σ_(b) ^(C=σ) _(T) ^(C)−σ_(m) The structural stresses with respect to the upper half of the thickness (as shown in FIG. 6C) can be approximated as: $\sigma_{s} = {\sigma_{T}^{C} + {\frac{L}{l}\left( {\sigma_{b}^{C} - \sigma_{b}^{B}} \right)}}$

It is noted that general monotonic and symmetric stress distributions can be handled in a manner to that illustrated in FIGS. 11 and 12, with the exception that t₂ and the corresponding appropriate equilibrium conditions must be accounted for in the manner discussed above with respect to FIG. 6C. A structure including a partial thickness fatigue crack, as illustrated with reference to FIGS. 5A-5C above, can also be treated with a technique similar to that illustrated with reference to FIG. 11, as long as the two strain gauges 60 utilized at the bottom of the structure 20 (see FIG. 11) are positioned a distance t, from the top edge (see FIG. 5B). The specific calculation procedures are then the same as those illustrated with reference to the monotonic through-thickness distribution case of FIG. 11.

It is also noted that the present application discusses conventional strain gauges as a suitable means for measuring displacement/strain merely for the purposes of illustrating the present invention. It is contemplated that a variety of displacement/strain measurement devices may be employed according to the present invention including, but not limited to, imaging devices, laser-based devices, fiber-optic gauges, ultrasonic gauges, etc.

For the purposes of describing and defining the present invention it is noted that the term “substantially” is utilized herein to represent the inherent degree of uncertainty that may be attributed to any quantitative comparison, value, measurement, or other representation. The term “substantially” is also utilized herein to represent the degree by which a quantitative representation may vary from a stated reference without resulting in a change in the basic function of the subject matter at issue.

As will be appreciated by those practicing the present invention, it is possible to utilize alternatives to the selected integrations described in detail herein. Indeed, any mathematical or procedural operation that has a result that is substantially equivalent to the result of a selected integration may be performed according to the present invention. For the purpose of defining the present invention, a claim recitation of an operation having a result substantially equivalent to a result of a given integration reads on the integration itself and the equivalent operation.

Having described the invention in detail and by reference to preferred embodiments thereof, it will be apparent that modifications and variations are possible without departing from the scope of the invention defined in the appended claims. More specifically, although some aspects of the present invention are identified herein as preferred or particularly advantageous, it is contemplated that the present invention is not necessarily limited to these preferred aspects of the invention. 

1. A method of analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure from a representation of the structure, said method comprising: determining a through-thickness stress distribution σ_(x)(y) along a selected cross section of said structure, wherein said localized region lies adjacent to said selected cross section, and wherein said stress distribution σ_(x)(y) is determined from said representation of said structure; determining a first component σ_(M) of said structural structural stress σ_(s) in said localized region by performing an operation having a result substantially equivalent to a result of the following first integration $\sigma_{M} = {\frac{1}{t}{\int_{o}^{t}{{\sigma_{X}(y)}{\mathbb{d}y}}}}$ where σ_(x)(y) represents said through-thickness stress distribution and t corresponds to the thickness of said structure in said selected cross section; determining a second component σ_(B) of said structural stress σ_(s) in said localized region by performing an operation having a result substantially equivalent to a solution of the following equation for σ_(B) ${{\left( \frac{t^{2}}{2} \right)\sigma_{M}} + {\left( \frac{t^{2}}{6} \right)\sigma_{B}}} = {{\int_{0}^{t}{{\sigma_{x}(y)}y{\mathbb{d}y}}} + {\delta{\int_{0}^{t}{{t_{xy}(y)}{\mathbb{d}y}}}}}$ where y corresponds to a distance from y=0 to a material point of interest along said selected cross section, t corresponds to the thickness of said structure in said selected cross section, δ is a value defined in said representation of said structure, σ_(x)(y) represents said through-thickness stress distribution, and τ_(xy)(y) represents a through-thickness shear stress distribution of said structure; and calculating said structural stress σ_(s) by combining said first component σ_(M) of said structural stress and said second component σ_(B) of said structural stress.
 2. A method analyzing structural stress as claimed in claim 1 wherein said second component σ_(B) of said structural stress σ_(s) in said localized region is determined by defining the following relation where the shear stress distribution in the region is negligible: δ∫₀^(t)t_(xy)(y)𝕕y = 0
 3. A method of analyzing structural stress as claimed in claim 2 wherein said shear stress distribution τ_(xy)(y) is determined from said structural representation.
 4. A method of analyzing structural stress as claimed in claim 1 wherein said selected cross section of said structure is defined by a thickness t and includes a partial thickness fatigue crack extending a distance t_(I) from a surface of said localized region, and wherein said method comprises: determining said first and second components σ_(M), σ_(B) of said structural stress σ_(s) in said localized region by performing respective operations having results substantially equivalent to respective results of four equations, where a first equation of said four equations defines a sub-component σ_(m)′ of the structural stress σ_(s), a second equation of said four equations defines a force equilibrium condition, a third equation of said four equations defines a moment equilibrium condition, and a fourth equation of said four equations defines a stress continuity condition.
 5. A method of analyzing structural stress as claimed in claim 4 wherein said first equation is as follows: $\sigma_{M}^{\prime} = {{\frac{1}{t - t_{1}}{\int_{0}^{t - t_{1}}{{\sigma_{x}(y)}{\mathbb{d}y}}}} - {\frac{1}{t - t_{1}}{\int_{0}^{\delta}{{\tau_{yx}(x)}{\mathbb{d}x}}}}}$
 6. A method of analyzing structural stress as claimed in claim 4 wherein said force equilibrium condition is as follows: σ_(M) t ₁+σ_(m)′(t−t ₁)=σ_(m) t where $\sigma_{m} = {{\frac{1}{t_{1}}{\int_{0}^{t_{1}}{{\sigma_{x}(y)}{\mathbb{d}y}}}} + {\frac{1}{t_{1}}{\int_{0}^{\delta}{{\tau_{yx}(x)}{\mathbb{d}x}}}}}$
 7. A method of analyzing structural stress as claimed in claim 4 wherein σ_(m)′ and σ_(b)′ comprise respective sub-components of said structural stress σ_(s) and wherein said moment equilibrium condition is as follows: ${{\left( {\sigma_{M} - \sigma_{B}} \right){t_{1}\left( {t - \frac{t_{1}}{2}} \right)}} + {\sigma_{B}{t_{1}\left( {t - \frac{t_{1}}{3}} \right)}} + {\sigma_{m}^{\prime}\quad\frac{\left( {t - t_{1}} \right)^{2}}{2}} + {\sigma_{b}^{\prime}\quad\frac{\left( {t - t_{1}} \right)^{2}}{6}}} = {{\sigma_{m}\left( \frac{t^{2}}{2} \right)} + {\sigma_{b}\left( \frac{t^{2}}{6} \right)}}$ where $\sigma_{m} = {\frac{1}{t_{1}}{\int_{0}^{t_{1}}{{\sigma_{x}(y)}{\mathbb{d}y}}}}$ (y)dy and σ_(B) is determined by solving the following for σ_(B) ${{\left( \frac{t_{1}^{2}}{2} \right)\sigma_{m}} + {\left( \frac{t_{1}^{2}}{6} \right)\sigma_{b}}} = {{\int_{0}^{t_{1}}{{\sigma_{x}(y)}y{\mathbb{d}y}}} + {\delta{\int_{0}^{t_{1}}{{\tau_{xy}(y)}{\mathbb{d}y}}}} + {\int_{0}^{\delta}{{\sigma_{y}(x)}x{\mathbb{d}x}}}}$ where δ represents a value derived from a representation of said structure and τ_(xy)(y) represents a through-thickness shear stress distribution of said structure, as determined from said representation of said structure.
 8. A method of analyzing structural stress as claimed in claim 4 wherein σ_(m)′ and σ_(b)′ comprise respective sub-components of said structural stress σ_(s) and wherein said stress continuity condition at y=t−t₁ is as follows: σ_(M)−σ_(B)=σ_(m)′+σ_(b)′
 9. A method of analyzing structural stress as claimed in claim 1 wherein said selected cross section of said structure is characterized by a thickness t and defines a non-monotonic through thickness stress distribution characterized by a minimum axial stress along a secondary axis lying in said localized region a distance t₂ below a surface of said structure, and wherein said method comprises: determining said first and second components σ_(M), σ_(B) of said structural stress σ_(s) in said localized region by performing an operations having results substantially equivalent to a result of solving simultaneously first and second equations with two unknowns, σ_(M) and σ_(B).
 10. A method of analyzing structural stress as claimed in claim 9 wherein: said structural stress σ_(s) is calculated by combining said first component of σ_(M) of said structural stress and said second component σ_(B) of said structural stress with two additional structural stress parameters σ_(m)′ and σ_(b)′ and said additional structural stress parameters σ_(m)′ and σ_(b)′ are related to said first and second components σ_(M), σ_(B) as follows: σ_(M)−σ_(B)=σ_(m)′−σ_(b)′
 11. A method of analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure from a three-dimensional finite element solid model of the structure, said method comprising: identifying at least one local element for structural stress extraction, wherein said local element lies adjacent to said localized fatigue-prone region; determining stress resultants f_(x′)f_(z′), and m_(y′) for said local element from said finite element solid model of said structure, wherein said stress resultants represent the sectional forces and moments for said local element; and calculating structural stress σ_(s) in said localized fatigue-prone region utilizing the following equation: $\sigma_{s} = {{\sigma_{M} + \sigma_{B}} = {\frac{f_{x^{\prime}}}{t} + \frac{6\left( {m_{y^{\prime}} + {\delta\quad f_{z^{\prime}}}} \right)}{t^{2}}}}$ where δ and t represent dimensional values of said local element.
 12. A technique for analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure defining a substantially monotonic through thickness stress distribution, said technique comprising: measuring displacement in the vicinity of said fatigue-prone region by configuring at least one measuring device to measure displacement along a first cross section of said structure offset a distance L from said fatigue-prone region, and measure displacement along a second cross section of said structure offset a distance L-l from said fatigue prone region; decomposing stress measurements at said strain gauges as follows $\sigma_{b}^{B} = {\frac{1}{2}\left( {\sigma_{T}^{B} - \sigma_{B}^{B}} \right)}$ $\sigma_{b}^{C} = {\frac{1}{2}\left( {\sigma_{T}^{C} - \sigma_{B}^{C}} \right)}$ where said superscript B corresponds to a measurement at said first cross section, said superscript C corresponds to a measurement at said second cross section, said subscript T corresponds to a measurement at a top surface of said structure, and said subscript B corresponds to a measurement at a bottom surface of said structure; and approximating structural stress σ_(s) in said fatigue-prone region as follows: $\sigma_{s} = {\sigma_{T}^{C} + {\frac{L}{l}\left( {\sigma_{b}^{C} - \sigma_{b}^{B}} \right)}}$ where the distances L and l are measured in terms of fractions of thickness t.
 13. A technique for analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure defining a non-monotonic through thickness stress distribution, said technique comprising: measuring displacement in the vicinity of said fatigue-prone region by configuring at least one measuring device to measure displacement along a first cross section of said structure offset a distance L from said fatigue-prone region, measure displacement along a second cross section of said structure offset a distance L-l from said fatigue prone region, and measure displacement along a third cross section of said structure, wherein said third cross section defines an approximately linear structural stress distribution. decomposing stress measurements at said strain gauges as follows σ_(b) ^(B)=(σ_(T) ^(B)−σ_(m)) σ_(b) ^(C)=(σ_(T) ^(C)−σ_(m)) where said superscript B corresponds to a measurement at said first cross section, said superscript C corresponds to a measurement at said second cross section, said subscript T corresponds to a measurement at a top surface of said structure, and σ_(m) is a through thickness mean stress measurement taken at said third cross section; and approximating structural stress σ_(s) in said fatigue-prone region as follows $\sigma_{s} = {\sigma_{T}^{C} + {\frac{L}{l}\left( {\sigma_{b}^{C} - \sigma_{b}^{B}} \right)}}$ where the distances L and l are measured in terms of fractions of thickness t.
 14. A computer-readable medium encoded with a computer program for analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure, said program being operative to: determine a through-thickness stress distribution σ_(x)(y) along a selected cross section of said structure, wherein said localized region lies adjacent to said selected cross section; determine a membrane component σ_(M) and a bending component σ_(B) of said structural stress σ_(s) in said localized region from said through thickness stress distribution σ_(x)(Y), wherein said membrane and bending components comprise simple structural stress distributions that are equilibrium-equivalent to said through thickness stress distribution σ_(x)(y); and calculate said structural stress σ_(s) by combining said first component σ_(M) of said structural stress and said second component σ_(B) of said structural stress.
 15. A computer-readable medium encoded with a computer program for analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure, said program being operative to: identify at least one local element for structural stress extraction, wherein said local element lies adjacent to said localized fatigue-prone region; determine stress resultants f_(x′), f_(z′), and m_(y′) for said local element from said finite element solid model of said structure, wherein said stress resultants represent the sectional forces and moments for said local element; and calculate structural stress σ_(s) in said localized fatigue-prone region utilizing the following equation $\sigma_{s} = {{\sigma_{M} + \sigma_{B}} = {\frac{f_{x^{\prime}}}{t} + \frac{6\left( {m_{y^{\prime}} + {\delta\quad f_{z^{\prime}}}} \right)}{t^{2}}}}$ where δ and t represent dimensional values of said local element.
 16. A system for analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure, said system including a controller programmed to: determine a through-thickness stress distribution σ_(x)(y) along a selected cross section of said structure, wherein said localized region lies adjacent to said selected cross section; determine a membrane component σ_(M) and a bending component σ_(B) of said structural stress σ_(s) in said localized region from said through-thickness stress distribution σ_(x)(y), wherein said membrane and bending components comprise simple structural stress distributions that are equilibrium-equivalent to said through thickness stress distribution σ_(x)(y); and calculate said structural stress σ_(s) by combining said first component σ_(M) of said structural stress and said second component σ_(B) of said structural stress.
 17. A system for analyzing structural stress or in a localized fatigue-prone region of a structure, said system including a controller programmed to: identify at least one local element for structural stress extraction, wherein said local element lies adjacent to said localized fatigue-prone region; determine stress resultants f_(x′), f_(z′), and m_(y′) for said local element from said finite element solid model of said structure, wherein said stress resultants represent the sectional forces and moments for said local element; and calculate structural stress σ_(s) in said localized fatigue-prone region utilizing the following equation $\sigma_{s} = {{\sigma_{M} + \sigma_{B}} = {\frac{f_{x^{\prime}}}{t} + \frac{6\left( {m_{y^{\prime}} + {\delta\quad f_{z^{\prime}}}} \right)}{t^{2}}}}$ where δ and t represent dimensional values of said local element.
 18. A system for analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure, said system comprising: at least one measuring device configured to measure displacement in the vicinity of said fatigue-prone region by measuring displacement along a first cross section of said structure offset a distance L from said fatigue-prone region, and measuring displacement along a second cross section of said structure offset a distance L-l from said fatigue prone region; and a controller programmed to decompose stress measurements at said strain gauges as follows $\sigma_{b}^{B} = {\frac{1}{2}\left( {\sigma_{T}^{B} - \sigma_{B}^{B}} \right)}$ $\sigma_{b}^{C} = {\frac{1}{2}\left( {\sigma_{T}^{C} - \sigma_{B}^{C}} \right)}$ where said superscript B corresponds to a measurement at said first cross section, said superscript C corresponds to a measurement at said second cross section, said subscript T corresponds to a measurement at a top surface of said structure, and said subscript B corresponds to a measurement at a bottom surface of said structure, and approximate structural stress σ_(s) in said fatigue-prone region as follows $\sigma_{s} = {\sigma_{T}^{C} + {\frac{L}{l}\left( {\sigma_{b}^{C} - \sigma_{b}^{B}} \right)}}$ where the distances L and l are measured in terms of fractions of thickness t
 19. A system for analyzing structural stress σ_(s) in a localized fatigue-prone region of a structure, said system comprising: at least one measuring device configured to measure displacement in the vicinity of said fatigue-prone region by measuring displacement along a first cross section of said structure offset a distance L from said fatigue-prone region, measuring displacement along a second cross section of said structure offset a distance L-l from said fatigue prone region; and measuring displacement along a third cross section of said structure, wherein said third cross section defines an approximately linear structural stress distribution; and a controller programmed to decompose stress measurements at said strain gauges as follows σ_(b) ^(B)=(σ_(T) ^(B)−σ_(m)) σ_(b) ^(C)=(σ_(T) ^(C−σ) _(m)) where said superscript B corresponds to a measurement at said first cross section, said superscript C corresponds to a measurement at said second cross section, said subscript T corresponds to a measurement at a top surface of said structure, and σ_(m) is a through thickness mean stress measurement taken at said third cross section; and approximate structural stress a, in said fatigue-prone region as follows $\sigma_{s} = {\sigma_{T}^{C} + {\frac{L}{l}\left( {\sigma_{b}^{C} - \sigma_{b}^{B}} \right)}}$ where the distances L and l are measured in terms of fractions of thickness t.
 20. A method of analyzing structural stress in a localized fatigue-prone region of a structure, said method comprising: determining a through-thickness stress distribution along a selected cross section of said structure, wherein said localized region lies adjacent to said selected cross section and said through-thickness stress distribution is determined from a finite element model of said structure; determining a membrane component and a bending component of said structural stress in said localized region from said through thickness stress distribution, wherein said membrane and bending components comprise simple structural stress distributions that are equilibrium-equivalent to said through thickness stress distribution; and calculating said structural stress by combining said first component of said structural stress and said second component of said structural stress, wherein said membrane component and said bending component are determined such that said structural stress calculation is substantially independent of the size, shape and distribution of mesh elements defining said finite element model of said structure.
 21. A method of analyzing structural stress as claimed in claim 20 wherein said membrane component and said bending component are determined such that said structural stress is substantially independent of mesh size over a mesh size range extending from about 0.16t and 0.1t, along respective x and y axes, to about 2t and t along respective x and y axes, where t represents the thickness of said structure.
 22. A method of analyzing structural stress as claimed in claim 20 wherein said membrane component and said bending component are determined such that said structural stress is substantially independent of mesh size over a mesh size range extending from about 0.008t and 0.02t, along respective x and y axes, to about 0.4t and 0.5t along respective x and y axes.
 23. A method of analyzing structural stress as claimed in claim 20 wherein said membrane component and said bending component are determined such that said structural stress is substantially independent of mesh size over a mesh size range extending up to about 2t and t along respective x and y axes.
 24. A method of analyzing structural stress a, in a localized fatigue-prone region of a structure, said method comprising: determining a through-thickness stress distribution σ_(x)(y) along a selected cross section of said structure, wherein said localized region lies adjacent to said selected cross section; determining a membrane component σ_(M) and a bending component σ_(B) of said structural stress σ_(s) in said localized region from said through thickness stress distribution σ_(x)(y), wherein said membrane and bending components comprise simple structural stress distributions that are equilibrium-equivalent to said through thickness stress distribution σ_(x)(y); and calculating said structural stress σ_(s) by combining said first component σ_(M) of said structural stress and said second component σ_(B) of said structural stress.
 25. A method of analyzing structural stress as claimed in claim 24 wherein said membrane component σ_(M) and said bending component σ_(B) are determined as a function of the following variables: a distance variable y corresponding to a distance from y=0 to a material point of interest along said selected cross section; and a thickness variable t corresponding to a thickness of said structure in said selected cross section.
 26. A method of analyzing structural stress as claimed in claim 25 wherein said membrane component σ_(M) and said bending component σ_(B) are determined as a function of the following variables: a distance variable y corresponding to a distance from y=0 to a material point of interest along said selected cross section; a thickness variable t corresponding to a thickness of said structure in said selected cross section; a finite element value δ representing a value defined in a finite element representation of said structure; and a distribution T_(xy)(y) representing a through-thickness shear stress distribution of said structure derived from a finite element model of said structure. 